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Helping At-Risk Students Add Up: Motivational Lessons for Students PDF

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Western Kentucky University TopSCHOLAR® Honors College Capstone Experience/Thesis Honors College at WKU Projects 12-1-2001 Helping At-Risk Students Add Up: Motivational Lessons for Students in High School Mathematics Karen Beckner Western Kentucky University Follow this and additional works at:http://digitalcommons.wku.edu/stu_hon_theses Part of theMathematics Commons,School Psychology Commons, and theScience and Mathematics Education Commons Recommended Citation Beckner, Karen, "Helping At-Risk Students Add Up: Motivational Lessons for Students in High School Mathematics" (2001).Honors College Capstone Experience/Thesis Projects.Paper 12. http://digitalcommons.wku.edu/stu_hon_theses/12 This Thesis is brought to you for free and open access by TopSCHOLAR®. It has been accepted for inclusion in Honors College Capstone Experience/ Thesis Projects by an authorized administrator of TopSCHOLAR®. For more information, please contact [email protected]. Helping At-Risk Students Add Up: Motivational Lessons for Students in High School Mathematics Senior Honors Thesis Karen Lynn Beckner Western Kentucky University Fall 2001 Approved by ___________________________________________ ___________________________________________ ___________________________________________ ___________________________________________ ___________________________________________ 2 Acknowledgements I would like to say a special thanks to the following people who helped make this thesis possible: Mom and Dad – For providing a loving home and teaching me the importance of learning. Your love and support have guided me through this just as it has through everything I have done through the years. Without you, none of this would have been possible. Jason – For listening and understanding as I shared my successes and failures of this thesis with you throughout the year. You are my best friend. Professors Weidemann and Rutledge – You were so patient to read and revise my work, as well as to listen to the problems I had along the way. Thank you for giving your time to your students so willingly. Professor Wilson – Not only were you willing to take on the task of my second reader, but your class on Secondary Teaching Strategies was my inspiration for the topic of this thesis. Thank you for your devotion to motivating students to learn. Rebecca Moore, Larry Philips, and the summer school staff at Trimble County High School – It was a wonderful opportunity that you allowed me to come into a classroom and teach some of my lessons. The learning experience was very valuable not only to my thesis work but to my future career as a high school mathematics teacher. Kellie Lee, Tim Winters, Dr. Bob Stivers, and the staff at Bowling Green High School – Thank you for helping me set up times to observe classes and being willing to have me as a guest in your school. The information I gained from these observations was invaluable. 3 Mathematics, which can be easily related to the real-world, is often taught as a separate subject that is taught one hour, or less, of each school day. In this context, the students cannot possibly be expected to relate mathematics to their own lives. In fact, they perceive the mathematics that they complete in class as work and strive to leave it behind them as soon as class has ended. (Midkiff, 1993, p. 7) 4 Table of Contents FOREWORD..................................................................................................................................6 A Need for Change.................................................................................................................8 Why Are Indirect Methods More Effective?..........................................................................9 Examples of Indirect Teaching Strategies............................................................................13 Implementing Indirect Teaching Strategies..........................................................................17 OBSERVATIONS AT BOWLING GREEN HIGH SCHOOL IN BOWLING GREEN, KY....18 School Context......................................................................................................................18 February 20, 2001.................................................................................................................19 February 22, 2001.................................................................................................................20 February 23, 2001.................................................................................................................21 February 26, 2001.................................................................................................................23 March 5, 2001.......................................................................................................................24 ALGEBRA LESSON PLANS FOR AT-RISK HIGH SCHOOL STUDENTS...........................26 ANALYSIS OF THE EFFECTIVENESS OF THE LESSON PLANS.......................................27 School Context......................................................................................................................27 5 Summer School Context.......................................................................................................28 Analysis of Lesson Plans......................................................................................................29 CONCLUSION.............................................................................................................................35 RESEARCH-BASED LESSON PLANS.....................................................................................37 Lesson Plan #1 – A Systematic Approach to Solving Word Problems................................37 Lesson Plan #2 – Understanding Direct and Inverse Relationships.....................................48 Scoring Rubric......................................................................................................................52 Lesson Plan #3 – Using Right Triangle Algebra for Practical Purposes..............................53 Lesson Plan #4 – Occurrences of Trigonometry in Commonplace Machines......................58 Lesson Plan #5 – The Basics of Graphing Points and Lines................................................62 Lesson Plan #6 – Properties and Applications of Linear Equations.....................................66 Lesson Plan #7 – Solving Systems of Equations with Two Unknowns...............................72 Lesson Plan #8 – Using Statistics to Manage a Successful City..........................................78 Lesson Plan #9 – Investigating the Properties of a System of Inequalities..........................84 Lesson Plan #10 – Investigating Properties of Quadratic Equations....................................88 Lesson Plan #11 – Using Algebra Tiles and the A-B-C Method to Factor Quadratic Equations...............................................................................................................................93 Lesson Plan #12 – Investigating Properties of Absolute Value Equations.........................102 BIBLIOGRAPHY.......................................................................................................................107 APPENDIX: ONLINE RESOURCES FOR TEACHERS.........................................................112 6 Foreword According to Teaching in America, a Carnegie Corporation report shows that nineteen million adolescents in the United States are considered at-risk students, students whose home conditions and backgrounds are such an obstacle that they are in danger of failing and/or dropping out of school (Morrison, 2000, p. 201). These students are facing a variety of situations such as minority and low socioeconomic statuses, low levels of proficiency in the English language, dysfunctional families, unstable home lives, high drug or community crime rates, and teenage pregnancies. These factors do not say that these students are certainly going to fail or drop out of school. Some do overcome these situations, but as they face these difficulties, school often becomes significantly less of a priority for many at-risk students. The teacher in the classroom is often the one who contends with students who care little about learning, and must somehow find a way to connect with them and motivate them to learn. Mathematics may be one of the most complicated subjects to teach to at-risk learners. Finding people in the United States who see the value of learning mathematics is difficult; as a result, many people lack basic mathematics skills needed to solve problems in everyday life. It is no secret that some individuals perceive America as being behind many industrialized countries in science and mathematics. One study shows that fourteen out of twenty countries scored higher in mathematics and science than the United States (Ornstein & Lasley, 2000, p. 91). This 7 problem is only magnified for students who are at-risk. Many of these other countries do not test all of their students, nor does everyone have to go to school. These factors make the problem seem greater than it really is. Nonetheless, many of these countries do have different strategies for teaching mathematics to their students that seem to work more efficiently than some strategies teachers use in American high schools. Educators agree that we need to do something to help solve this crisis. Research suggests that weak motivation lies at the root of these students’ difficulties in school. Any motivation they do have is often extrinsic instead of intrinsic. They feel they have bigger issues to deal with than school. This lack of intrinsic motivation is generally the major difference between those who are at-risk and other learners in the classroom. The at-risk students also spend less time engaged in any given activity, meaning they generally do not learn as much (Middleton, 1995, p. 254). Students with intrinsic motivation typically have a desire to learn or excel, so the methods teachers use in reaching highly motivated students are not quite as important for these students. Educators should focus on finding a method that motivates lower- achieving pupils to succeed and at the same time does not neglect higher-achieving students. The methods teachers currently use in the classroom fall into two groups, direct and indirect instruction. Direct teaching methods involve teacher-centered methodologies, including lecture, questioning, discussion, and practice and drill. Indirect methods are student-centered activities such as role-playing, simulations and games, inquiry and discovery (such as experimentation), and independent projects (Morrison 2000, pp. 523, 526). Though teachers tend to use direct instruction most often in mathematics classrooms, indirect methods are the most effective way to motivate high school students to learn mathematics, especially students considered by educators to be at-risk. Educators acknowledge 8 the need for a change from current methods, and recognize specific techniques that help students learn mathematics. Using a variety of these indirect strategies, one may develop lesson plans, which improve students’ achievement in mathematics and motivate them to learn and appreciate mathematics outside of the classroom. A Need for Change In the 1989-90 school year, only about fifty percent of juniors and seniors in high school had mastered eighth-grade mathematics (Englelmann, Carnine, & Steely, 1991, p. 292). In 1996 only sixteen percent of seniors met twelfth-grade performance standards (Ornstein & Lasley, 2000, p. 90). These numbers indicate that current approaches to teaching these students are not working. Somehow, the majority of American students graduating from high school are not gaining the mathematics education they need, and schools are sending students out into the workforce unprepared to handle basic mathematics problems. This information was reported for all students in the U.S.; certainly the problem is much worse among students who are already at- risk for failing or dropping out of school. Part of the difference between our students and those in countries such as Japan, South Korea, Thailand, and Israel appears to be in the techniques educators use in their classrooms (Ornstein & Lasley, 2000, p. 91). Researchers have conducted numerous studies to try to determine these differences, and the answer seems to lie in the manner in which teachers are using class time. According to one study, Japanese students spend only forty-one percent of class instructional time practicing routine procedures as opposed to the ninety-six percent of class instructional time that U.S. students spend on the same types of activities (Maccini & Gagnon, 2000, ¶ 3). Studies show that these other countries use methods that emphasize higher mental processes, while schools in the United States tend to emphasize knowledge-based learning (Englemann, Carnine, & Steely, 9 1991, p. 292). If the United States began following the models of teaching set forth by other high-achieving countries, then perhaps the United States could close the gap in test scores. High-achieving countries seem to be using approaches in the classroom that focus on students and allow them to construct their own knowledge. In the United States, on the other hand, teachers often tell students what they should learn or memorize. As a result, students often forget information after taking a test. Direct methods of teaching, though sometimes necessary, emphasize learning for knowledge. Using indirect instruction, teachers not only help students gain knowledge but involve them in thinking that is more creative and utilizes higher cognitive processes. The National Council of Teachers in Mathematics has begun to realize the necessity of teaching students to think instead of simply repeating memorized facts and information. The recently revised Principles and Standards for School Mathematics (NCTM, 2000) places emphasis on connecting mathematics to other disciplines. The standards advocate the implementation of instructional approaches that focus on the student (Maccini & Gagnon, 2000, ¶ 22). Some teachers already realize the importance of using indirect teaching methods, and many of these same teachers feel they do not have the time or knowledge needed to put these methods into practice. Yet, if students do not learn through lecture as well as they could through indirect instruction, then the time taken for indirect instruction is a worthwhile endeavor. Why Are Indirect Methods More Effective? Indirect methods more effectively assist at-risk students as well as other students in learning information, remembering it longer, and applying the information to life situations. Ultimately, indirect methods utilize cognitive processes that require the students to become more involved is her or his own learning. Benjamin Bloom’s Cognitive Taxonomy breaks down the

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